The Berezin form on symmetric R-spaces and reflection positivity

Abstract

For a symmetric R-space K/L=G/P the standard intertwining operators provide a canonical G-invariant pairing between sections of line bundles over G/P and its opposite G/P. Twisting this pairing with an involution of G which defines a non-compactly causal symmetric space G/H we obtain an H-invariant form on sections of line bundles over G/P. Restricting to the open H-orbits in G/P constructs the Berezin forms studied previously by G. van Dijk, S. C. Hille and V. F. Molchanov. We determine for which H-orbits in G/P and for which line bundles the Berezin form is positive semidefinite, and in this case identify the corresponding representations of the dual group Gc as unitary highest weight representations. We further relate this procedure of passing from representations of G to representations of Gc to reflection positivity.